In this article two-dimensional autonomous Darboux type differential systems with nonlinearities of the ith (i = 2, 7) degree with respect to the phase variables are considered. For every such system the admitted Lie algebra is constructed. With the aid of these algebras particular invariant GL(2, R)-integrals as well as first integrals of considered systems are constructed. These integrals represent the algebraic curves of the (i − 1)th (i = 2, 7) degree. It is showed that the Darboux type systems with nonlinearities of the 2nd, the 4th and the 6th degree with respect to the phase variables do not have limit cycles..